Improved results of Perturbed inequalities for higher-order differentiable functions and their various applications

Samet ERDEN, M. Bahar Baskir

Abstract


A new integral equality for the function which has continuous derivatives up to the order (n-1) with n≥1 and that is n times differentiable are first improved by using the quadratic kernel mapping with five sections. After that, via this identity, refined inequalities of perturbed Ostrowski type for bounded functions and mappings of bounded variation are developed. What's more, new effective composite quadrature rules are derived to find closer estimates of the integral of a mapping. Some applications for exponential and logarithmic functions are also obtained by using inequalities presented in this study. Finally, new results involving Cumulative Distribution, the reliability function and expectation value of ramdom variable are given.

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